Inexact proximal ϵ -subgradient methods for composite convex optimization problems
Version 2 2024-06-05, 06:39Version 2 2024-06-05, 06:39
Version 1 2020-01-02, 10:46Version 1 2020-01-02, 10:46
journal contribution
posted on 2024-06-05, 06:39 authored by RD Millán, MP Machado© 2019, Springer Science+Business Media, LLC, part of Springer Nature. We present two approximate versions of the proximal subgradient method for minimizing the sum of two convex functions (not necessarily differentiable). At each iteration, the algorithms require inexact evaluations of the proximal operator, as well as, approximate subgradients of the functions (namely: theϵ-subgradients). The methods use different error criteria for approximating the proximal operators. We provide an analysis of the convergence and rate of convergence properties of these methods, considering various stepsize rules, including both, diminishing and constant stepsizes. For the case where one of the functions is smooth, we propose an inexact accelerated version of the proximal gradient method, and prove that the optimal convergence rate for the function values can be achieved. Moreover, we provide some numerical experiments comparing our algorithm with similar recent ones.
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Journal
Journal of Global OptimizationVolume
75Pagination
1029-1060Location
Berlin, GermanyPublisher DOI
ISSN
0925-5001eISSN
1573-2916Language
EnglishPublication classification
C1.1 Refereed article in a scholarly journalIssue
4Publisher
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Keywords
Science & TechnologyTechnologyPhysical SciencesOperations Research & Management ScienceMathematics, AppliedMathematicsSplitting methodsOptimization problemepsilon-SubdifferentialInexact methodsHilbert spaceAccelerated methodsMONOTONE-OPERATORSGRADIENT METHODSALGORITHMCONVERGENCEEXTRAGRADIENTSUME-Subdifferential4901 Applied mathematics
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